Non-commutative Iwasawa theory of abelian varieties over global function fields

Abstract

Let A be an abelian variety defined over a global function field F, and let p be a prime distinct from the characteristic of F. Let F∞ be a p-adic Lie extension of F that contains the cyclotomic Zp-extension Fcyc of F. In this paper, we investigate the structure of the p-primary Selmer group Sel(A/F∞) of A over F∞. We prove the MH(G)-conjecture for A/F∞. Furthermore, we show that both the μ-invariant of the Pontryagin dual of the Selmer group Sel(A/Fcyc) and the generalised μ-invariant of the Pontryagin dual of the Selmer group Sel(A/F∞) are zero, therby proving Mazur's conjecture for A/F. We then relate the order of vanishing of the characteristic elements, evaluated at Artin representations, to the corank of the Selmer group of the corresponding twist of A over the base field F. Assuming the finiteness of the Tate-Shafarevich group, we establish that this corank equals the order of vanishing of the L-function of A/F at s=1. Finally, we extend a theorem of Sechi - originally proved for elliptic curves without complex multiplication - to abelian varieties over global function fields. This is achieved by adapting the notion of generalised Euler characteristic, introduced by Zerbes for elliptic curves over number fields. This new invariant allows us, via Akashi series, to relate the generalised Euler characteristic of Sel(A/F∞) to the Euler characteristic of Sel(A/Fcyc).

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